tilting
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(mathematics) Having the property that it is the quotient of a projective module by a projective submodule, having an ext functor with itself of 0, and there being a right module as the kernel of a surjective morphism between finite direct sums of its direct summands.
tilting
The tilting module constructed in the proof is a quotient of a projective module by a projective submodule, has Ext with itself equal to zero, and admits a right module as the kernel of a surjective morphism between finite direct sums of its direct summands.
The tilting module constructed in the proof is a quotient of a projective module by a projective submodule, has Ext with itself equal to zero, and admits a right module as the kernel of a surjective morphism between finite direct sums of its direct summands.
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